You've just done some data collection to determine the popularity of courses at your high school. Your calculations show that 75% of the students take Geometry and 15% of the students take both Chemistry and Geometry. How would you find the probability that a student who is taking Chemistry is also taking Geometry?

### Watch This

First watch this video to learn about conditional probability.

CK-12 Foundation: Chapter2ConditionalProbabilityA

Then watch this video to see some examples.

CK-12 Foundation: Chapter2ConditionalProbabilityB

Watch this video for more help.

Khan Academy Probability (part 6)

### Guidance

What if the probability of a second event is affected by the probability of the first event? This type of probability calculation is known as
**
conditional probability
**
.

When working with events that are conditionally probable, you are working with 2 events, where the probability of the second event is conditional on the first event occurring. Say, for example, that you want to know the probability of drawing 2 kings from a deck of cards. As we have previously learned, here is how you would calculate this:

Now let’s assume you are playing a game where you need to draw 2 kings to win. You draw the first card and get a king. What is the probability of getting a king on the second card? The probability of getting a king on the second card can be thought of as a conditional probability. The formula for calculating conditional probability is given as:

Another way to look at the conditional probability formula is as follows. Assuming the first event has occurred, the probability of the second event occurring is:

Let’s work through a few problems using the formula for conditional probability.

#### Example A

You are playing a game of cards where the winner is determined when a player gets 2 cards of the same suit. You draw a card and get a club . What is the probability that the second card will be a club?

**
Step 1:
**
List what you know.

First event = drawing the first club

Second event = drawing the second club

**
Step 2:
**
Calculate the probability of choosing a club as the second card when a club is chosen as the first card.

**
Step 3:
**
Write your conclusion.

Therefore, the probability of selecting a club as the second card when a club is chosen as the first card is 24%.

#### Example B

In the next round of the game, the first person to be dealt a black ace wins the game. You get your first card, and it is a queen. What is the probability of obtaining a black ace?

**
Step 1:
**
List what you know.

First event = being dealt the queen

Second event = being dealt the black ace

**
Step 2:
**
Calculate the probability of choosing black ace as a second card when a queen is chosen as a first card.

**
Step 3:
**
Write your conclusion.

Therefore, the probability of selecting a black ace as the second card when a queen is chosen as the first card is 3.9%.

#### Example C

Sandra went out for her daily run. She goes on a path that has alternate routes to give her a variety of choices to make her run more enjoyable. The path has 3 turns where she can go left or right at each turn. The probability of turning right the first time is . Based on past runs, the probability of turning right the second time is . Draw a tree diagram to represent the path. What is the probability that she will turn left the second time after turning right the first time?

**
Step 1:
**
List what you know.

**
Step 2:
**
Calculate the probability of choosing left as the second turn when right is chosen as the first turn.

**
Step 3:
**
Write your conclusion.

Therefore, the probability of choosing left as the second turn when right was chosen as the first turn is 33%.

### Guided Practice

At Bluenose High School, 90% of the students take Physics and 35% of the students take both Physics and Statistics. What is the probability that a student from Bluenose High School who is taking Physics is also taking Statistics?

**
Answer:
**

**
Step 1:
**
List what you know.

**
Step 2:
**
Calculate the probability of choosing Statistics as a second course when Physics is chosen as a first course.

**
Step 3:
**
Write your conclusion.

Therefore, the probability that a student from Bluenose High School who is taking Physics is also taking Statistics is 39%.

### Practice

- 2 fair dice are rolled. What is the probability that the sum is even given that the first die that is rolled is a 2?
- 2 fair dice are rolled. What is the probability that the sum is even given that the first die rolled is a 5?
- 2 fair dice are rolled. What is the probability that the sum is odd given that the first die rolled is a 5?
- Steve and Scott are playing a game of cards with a standard deck of playing cards. Steve deals Scott a black king. What is the probability that Scott’s second card will be a red card?
- Sandra and Karen are playing a game of cards with a standard deck of playing cards. Sandra deals Karen a red seven. What is the probability that Karen’s second card will be a black card?
- Donna discusses with her parents the idea that she should get an allowance. She says that in her class, 55% of her classmates receive an allowance for doing chores, and 25% get an allowance for doing chores and are good to their parents. Her mom asks Donna what the probability is that a classmate will be good to his or her parents given that he or she receives an allowance for doing chores. What should Donna's answer be?
- At a local high school, the probability that a student speaks English and French is 15%. The probability that a student speaks French is 45%. What is the probability that a student speaks English, given that the student speaks French?
- At a local high school, the probability that a student takes statistics and art is 10%. The probability that a student takes art is 65%. What is the probability that a student takes statistics, given that the student takes art?
- The test for a disease is accurate 80% of the time, and 2.5% of the population has the disease. What is the probability that you have the disease, given that you tested positive?
- For question 9, what is the probability that you don't have the disease, given that you tested negative?